permutation of n things not all different let n things be
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Permutation of n things not all different
Let n things be represented by letters, and
p of them are alike, q of them are alike,
of them are alike; and so on.
The required number of permutations is
A A A B B C C C C
A A A B B C C C C
A A A B B C C C C and so on 9!
Pg.26,No.18.
In the word COMMITTEE, there are 9 letters, 1 C's
, 1 O's , 2 M's , 1 I's , 2 T's and 2 E's .
The no. of total arrangement ways
The no. of ways that begin and end with consonants
__ __ __ __ __ __ __ __ __
The no. of ways that central letters may be vowels
and begin and end with consonants
__ __ __ __ __ __ __ __ __
The no. of ways that all vowels are always come to
appear together = ?
The no. of ways that all vowels are not come to
appear together = ?
The no. of ways that all vowels are to be
separated = ?
In the word INFINTTESIMAL, there are
13 letters, 3 I's , 2 N's , 1 F's , 2 T's , 1 E's , 1
S's , 1 M's 1 A's and 1 L's .
The number of vowels = 5
The number of arrangement ways
The number of arrangement ways such
that vowel as a central
The number of arrangement ways such
that all vowel always come together
Pg.27, No.20.
In the word CONSONANTS, there are 10 letters, 1
C's , 2 O's , 3 N's , 2 S's , 1 A's and 1 T's .
The number of arrangement ways
The number of arrangement ways such that
the two O's always come together
The number of arrangement ways such that
begin with the three N's
( _ _ ) _ _ _ _ _ _ _ _
_ _ _ / _ _ _ _ _ _ _
2 O’s together Begin 3 ‘N’
2 O’s together and begin 3 N,s
2 O
’s t
oget
her
an
d n
ot
beg
in 3
N’s
2 O
’ s
not
toget
her
an
d b
egin
3 N
’s
The number of arrangement ways such
that the two O's always come together and
begin with 3 N’s
__ __ __ / __ __ __ __ __ __ __
The number of arrangement ways such
that the two O's always come together and
do not begin with 3 N’s
The number of arrangement ways such
that the two O's never come together and
begin with N’s
The number of arrangement ways such that the two
O's always come together or begin with 3 N’s ?
The number of arrangement ways such that the two
O's do not come together and do not begin with 3
N’s ?
The number of arrangement ways such that the two
O's do not come together or do not begin with 3
N’s ?
Pg.27, No.21.
The maned of digits are 2 , 2 , 2 , 3 , 3 , 4 , 0 .
The no. of number over 2000000
__ __ __ __ __ __ __
The no. of even number over 2000000 numbers =
The no. of odd number over 2000000 numbers =
Pg.27, No.22.
In the word ENGINEERING, there are 11 letters, 3
E's , 3 N's , 2 G's , 2 I's and 1 R's .
The number of arrangement ways
The number of arrangement ways such
that the three E's
always come together
The number of arrangement ways such
that begin with the three E's
and end N
Pg.27, No.23
In the word CHARACTERISTICS, there are
15 letters, 3 C's , 1 H's , 2 A's , 2 R's , 2 T's , 1
E's ,2 I's and 2 S's .
The number of arrangement ways
The number of arrangement ways such that
the two R's always come together
The number of arrangement ways such that
two R's do not come together
2 T’s together three C’s together
2 T’s together and 3 C,s together
2 T
’s t
oget
her
an
d
3 C
’s n
ot
toget
her
2 T
’ s
not
toget
her
an
d 3
C’s
togrt
her
The number of arrangement ways such that the
two T's always come together
The number of arrangement ways such that two T's
come together and 3 C's come together
The number of arrangement ways such that two T's
come together and 3 C's do not come together
The number of ways that the two T's together and
2 C’s together =
Circular Permutation
The circular permutation of n things taken
all together
The number of ways in which n different
things can be arranged in a round table
The number of ways in which n different
things can be arranged in a ring
A
B
C D
E A B C D E
E A B C D
D E A B C
C D E A B
B C D E A
-
-
-
E
A
B C
D
D
E
A B
C
C
D
E A
B
B
C
D E
A
The number of
arrangement ways
for a round table is
The number of
arrangement ways
for a round table is
A
B
C D
E
A
E
D C
B
A
B
C D
E
The number of
arrangement ways
for a ring is A
E
D C
B
same ways
Pg.27, No.26.
The number of persons = 7
The number of ways 7 persons can be seated
at a round table, so that 3 of them
are never to be separated
Pg.28, No.28.
The number of keys = 7
The number of ways 7 different keys can be
placed on a keys ring, so that 2 of them
are never to be separated
Pg.27, No.26.
There are 4 boys and 4 girls
The number of total ways
The no. of ways that each guest is seated between
members of the opposite sex
B
B
B
B g g
g g
There are 7 boys and 3 girls
The no. of ways that all girls are separated in round
table = ?
There are 4 couples
The no. of ways that the two member of each couple
wish to sit together in round table
BG
BG
BG
BG
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